Due to limitations of the browser that is used for posting questions, it is not possible to read the equation properly. It is therefore impossible to proveide an answer. Sorry.
Try using "plus", "minus" and "equals".
It is: y = 6x+18 whereas 6 is the slope and 18 is the y intercept
If you mean y-5 = 6(x-4) then y = 6x-19 and using the same slope for point (4, 6) the equation is y = 6x-18 and both equations are parallel to each other.
If you mean line of 3x+2y = 5 then y = -3/2x+2.5 Perpendicular slope: 2/3 Perpendicular equation: 3y = 2x+18 or as 2x-3y+18 = 0
If you mean points of (-10, -6) and (-1, 8) then the slope of the line is 14/9 which is in a positive direction
If you mean y-6x = 18 then y = 6x+18 whereas 6 is the slope and 18 is the y intercept
A line with equation y = mx + c has slope m (and intercept c), thus convert the given equation into this form: 2x + 3y = 18 ⇒ 3y = -2x + 18 ⇒ y = -2/3x + 6 ⇒ slope is -2/3.
(3, 18), (3, 18) is just one point: it does not define a line.
It is: y = 6x+18 whereas 6 is the slope and 18 is the y intercept
If you mean: 2x+y = 18 then y = -2x+18 which is a straight line equation whereas -2 is the slope and 18 is the y intercept
As a straight line equation: y = -3x+18 in slope intercept form
This is not an equation because there's no equal sign If you mean: 6x -3y = 18 Then -3y = -6x+18 And: y = 2x-6 So the slope is 2 and the y intercept is -6
6x+3y = 18 3y = -6x+18 y = -2x+6 Therefore the slope is -2 and the y intercept is 6
Not enough information has been given because in order to work out a straight line equation the slope and coordinates of (x, y) must be given
y=-18x+17. Since this is already in Slope-Intercept form, we can determine that the slope is negative 18.
Points: (20, 18) and (35, 6) Slope: -4/5 Equation: y = -4/5x+34
Points: (13, 19) and (23, 17) Midpoint: (18, 18) Slope: -1/5 Perpendicular slope: 5 Perpendicular equation: y-18 = 5(x-18) => y = 5x-72
If you mean y-5 = 6(x-4) then y = 6x-19 and using the same slope for point (4, 6) the equation is y = 6x-18 and both equations are parallel to each other.